( ex x being object ex L being Sequence st
( x = last L & dom L = succ A & L . 0 = FinSETS & ( for C being Ordinal st succ C in succ A holds
L . (succ C) = H₃(C,L . C) ) & ( for C being Ordinal st C in succ A & C <> 0 & C is limit_ordinal holds
L . C = H₄(C,L | C) ) ) & ( for x1, x2 being set st ex L being Sequence st
( x1 = last L & dom L = succ A & L . 0 = FinSETS & ( for C being Ordinal st succ C in succ A holds
L . (succ C) = H₃(C,L . C) ) & ( for C being Ordinal st C in succ A & C <> 0 & C is limit_ordinal holds
L . C = H₄(C,L | C) ) ) & ex L being Sequence st
( x2 = last L & dom L = succ A & L . 0 = FinSETS & ( for C being Ordinal st succ C in succ A holds
L . (succ C) = H₃(C,L . C) ) & ( for C being Ordinal st C in succ A & C <> 0 & C is limit_ordinal holds
L . C = H₄(C,L | C) ) ) holds
x1 = x2 ) ) from ORDINAL2:sch 7();
hence ( ex b₁ being set ex L being Sequence st
( b₁ = last L & dom L = succ A & L . 0 = FinSETS & ( for C being Ordinal st succ C in succ A holds
L . (succ C) = Tarski-Class (L . C) ) & ( for C being Ordinal st C in succ A & C <> 0 & C is limit_ordinal holds
L . C = Universe_closure (Union (L | C)) ) ) & ( for b₁, b₂ being set st ex L being Sequence st
( b₁ = last L & dom L = succ A & L . 0 = FinSETS & ( for C being Ordinal st succ C in succ A holds
L . (succ C) = Tarski-Class (L . C) ) & ( for C being Ordinal st C in succ A & C <> 0 & C is limit_ordinal holds
L . C = Universe_closure (Union (L | C)) ) ) & ex L being Sequence st
( b₂ = last L & dom L = succ A & L . 0 = FinSETS & ( for C being Ordinal st succ C in succ A holds
L . (succ C) = Tarski-Class (L . C) ) & ( for C being Ordinal st C in succ A & C <> 0 & C is limit_ordinal holds
L . C = Universe_closure (Union (L | C)) ) ) holds
b₁ = b₂ ) ) ; :: thesis: verum